|
|||||
|
|
Dynamic contact of a beam against rigid obstacles: Convergence of a velocity-based approximation and numerical results |
|
| Institution: | 1. CIRAD, UMR AMAP, Boulevard de la Lironde, 34 398 Montpellier Cedex 5, France;2. Université de Lyon, Institut Camille Jordan UMR 5208, France;3. Université Jean Monnet, 23 rue Paul Michelon, 42023 Saint-Etienne Cedex 02, France;1. School of Science, Northwestern Polytechnical University, Xi''an, Shaanxi 710072, PR China;2. College of Science, Chang''an University, Xi''an, Shaanxi 710064, PR China;1. Department of Mathematical Analysis and Applications of Mathematics, Faculty of Science, Palacký University, 17. listopadu 12, 771 46 Olomouc, Czech Republic;2. Université de Lyon, CNRS, INSA-Lyon, ICJ UMR5208, F 69621, Villeurbanne, France |
| Abstract: | Motivated by the study of vibrations due to looseness of joints, we consider the motion of a beam between rigid obstacles. Due to the non-penetrability condition, the dynamics is described by a hyperbolic fourth order variational inequality. We build a family of fully discretized approximations of this problem by combining some classical space discretizations with velocity based time-stepping algorithms for discrete mechanical systems subjected to unilateral constraints. We prove the stability and the convergence of these numerical methods. Finally we propose some examples of implementation using either Hermite or B-spline finite element approximations. |
| Keywords: | Dynamic contact Elastic beam Non-penetrability conditions Sweeping process Space and time discretization Convergence |
| 本文献已被 ScienceDirect 等数据库收录! | |